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Kirigami-inspired highly stretchable nanoscale devices using multi-dimensional deformation of monolayer MoS2 Wei Zheng, Weicheng Huang, Feng Gao, Huihui Yang, Mingjin Dai, Guangbo Liu, Bin Yang, Jia Zhang, Yong Qing Richard Fu, Xiaoshuang Chen, Yunfeng Qiu, Dechang Jia, Yu Zhou, and PingAn Hu Chem. Mater., Just Accepted Manuscript • DOI: 10.1021/acs.chemmater.8b02464 • Publication Date (Web): 08 Aug 2018 Downloaded from http://pubs.acs.org on August 11, 2018
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Chemistry of Materials
Kirigami-inspired highly stretchable nanoscale devices using multi-dimensional deformation of monolayer MoS2 Wei Zheng, †,§ Weicheng Huang,﹟Feng Gao, †,§Huihui Yang, †,§ Mingjin Dai, †,§ Guangbo Liu, † Bin Yang, ﹟ Jia Zhang, † Yong Qing Richard Fu,¶ Xiaoshuang Chen,† Yunfeng Qiu, † Dechang Jia, ‡ Yu Zhou, ‡ PingAn Hu*,†,‡ †
Key Laboratory of Micro-systems and Micro-structures Manufacturing of Ministry of Education, Harbin Institute of
Technology, Harbin 150080, P. R. China. § ﹟
School of Materials Science and Engineering, Harbin Institute of Technology, Harbin, 150080, P. R. China Condensed Matter Science and Technology Institute and Department of Physics, Harbin Institute of Technology, Harbin
150080, China. ¶
Faculty of Engineering & Environment, Northumbria University, Newcastle upon Tyne, NE1 8ST, UK.
‡
Institute for Advanced Ceramics, Harbin Institute of Technology, Harbin 150001, P. R. China.
ABSTRACT: Two-dimensional (2D) layered materials, such as MoS2, are greatly attractive for flexible devices due to their unique layered structures, novel physical and electronic properties, and high mechanical strength. However, their limited mechanical strains ( ~15%), MoS2 films begin to break at the edges or joint places as shown in Figures 4g and 4j. The occurrence of breaking is usually defined as the yield point. This structural damage is irreversible. It’s worth noted that the MoS2/PDMS device with the Kirigami structure reaches the maximum reversible deformation of ~ 15%, much higher than that of the original planar MoS2 devices with a reversible strain of only ~ 0.75 %. To further understand the mechanical and electrical behaviors of the MoS2 Kirigami upon tensile loading, theoretical simulation was performed on the linear Kirigami pattern using the finite element method (FEM). The generated forces from the linear Kirigami pattern were analyzed using a beam theory based on the method from literature.29 As designed, such a sample with the linear Kirigami pattern will be bent out of plane into an angle θ with the horizontal plane under a uniaxial strain. The theoretically calculated values of θ at different strains of 5%, 10%, 15% and 20% are 17.5o, 24.5o, 29.5o and 33.5o, respectively. More information about the calculation results is shown in supporting information of Figure S7. With the increase of strain, the bent angle is increased, indicating that the PDMS substrate will be bent with a larger radius of curvature, and simultaneously the MoS2 on the surface of PDMS will experience a larger deformation. In order to understand the distribution of stress on sample surface, FEM analysis of the linearly patterned Kirigami structure was performed, and the results are shown in Figure 5. When the strain was applied along x-axis, the structure was bent out-of-plane, resulting in locally buckling patterns. We choose a small area of Kirigami structure for analysis as shown in the red-colored square in Figure 5a. This part of the structure will be deformed according to the beam bending theory,39 and the equations after bending deformation (Figure S8a) can be described using the following equation: (1) Any point of the bent curve can be described using the following equations: (2) (3) (4) Where q is the force applied on the beam, E and I are the Young’s modulus and rotational inertia, tanγ is the slope of the flexural beam equation in a position x,εMoS2 is defined as the strain of MoS2. The length of the hypotenuse was used to estimate the change of arc length ∆l. The function images of tanγ within the scope of (0, l) are shown in Figure S8b. In the scope of (0, 0.5l), the values of tanγ show a decreasing function with x, which means that with the increase of x, γ decreases. At the meantime, εMoS2 increases with the increase of x, which means that the maximum and minimum deformation values occur at the flexural beam center and edge, respectively.
Figure 5. FEM simulation of stress distribution at different strains. (a) The model of a typical linear Kirigami structure. (b) The strain distribution of the curve beam. (c) The strain distribution of Kirigami structure under different deformation rates. (d) The stress distribution of Kirigami structure under different deformation rates.
The simulated strain distribution is shown in Figure 5b. Tensile stress concentration and associated distortions exist in the deformation processes of the Kirigami structure, which leads to the non-uniform surface stress and deformation. In our MoS2/PDMS Kirigami experiments, one end of the Kirigami structure was fixed and the other end was stretched. The obtained displacements of the Kirigami structure under different values of deformation are shown in Figure S9. Figures 5c and 5d show the strain and stress distributions of the MoS2 Kirigami structure under different deformations. For the Kirigami structure, the initial elastic stage is similar to the deformation of the conventional MoS2 films (ε
